The following publications are possibly variants of this publication:
- An LMI based criterion for the nonexistence of overflow oscillations in fixed-point state-space digital filters using saturation arithmeticHaranath Kar. dsp, 17(3):685-689, 2007. [doi]
- Comment on Elimination of overflow oscillations in fixed-point state-space digital filters using saturation arithmetic: An LMI approach by V. Singh [Digital Signal ProcessHaranath Kar. dsp, 20(1):16, 2010.
- Elimination of overflow oscillations in fixed-point state-space digital filters with saturation arithmetic: an LMI approachHaranath Kar, Vimal Singh. tcas, 51-II(1):40-42, 2004. [doi]
- New results on saturation overflow stability of 2-D state-space digital filtersNeha Agarwal, Haranath Kar. jfi, 353(12):2743-2760, 2016. [doi]
- A new sufficient condition for the global asymptotic stability of 2-D state-space digital filters with saturation arithmeticHaranath Kar. sigpro, 88(1):86-98, 2008. [doi]
- New results on saturation overflow stability of 2-D state-space digital filters described by the Fornasini-Marchesini second modelNeha Agarwal, Haranath Kar. sigpro, 128:504-511, 2016. [doi]
- A note on the improved LMI-based criterion for global asymptotic stability of 2-D state-space digital filters described by Roesser model using two's complement overflow arithmeticHaranath Kar. dsp, 23(5):1767-1772, 2013. [doi]
- Elimination of overflow oscillations in digital filters employing saturation arithmeticHaranath Kar, Vimal Singh. dsp, 15(6):536-544, 2005. [doi]
- Stability analysis of 2-D digital filters with saturation arithmetic: an LMI approachHaranath Kar, Vimal Singh. tsp, 53(6):2267-2271, 2005. [doi]
- A new criterion for the global asymptotic stability of 2-D state-space digital filters with two's complement overflow arithmeticHaranath Kar. sigpro, 92(9):2322-2326, 2012. [doi]